L. L. Foldy, The Multiple Scattering of Waves. I. General Theory of Isotropic Scattering by Randomly Distributed Scatterers, Physical Review, vol.67, issue.3-4, pp.107-119, 1944.
DOI : 10.1103/PhysRev.67.107

V. Twersky, On Scattering of Waves by Random Distributions. I. Free???Space Scatterer Formalism, Journal of Mathematical Physics, vol.3, issue.4, pp.700-715, 1962.
DOI : 10.1063/1.1724272

[. P. Waterman and R. Truel, Multiple Scattering of Waves, Journal of Mathematical Physics, vol.2, issue.4, pp.512-537, 1961.
DOI : 10.1063/1.1703737

J. G. Fikioris and P. C. Waterman, Multiple Scattering of Waves. II. ``Hole Corrections'' in the Scalar Case, Journal of Mathematical Physics, vol.5, issue.10, pp.1413-1420, 1964.
DOI : 10.1063/1.1704077

D. Sornette, Acoustic waves in random media, Acustica 67, Part I : pp. 199-215, Part II, pp.251-265, 1989.

S. Lethuillier, P. Pareige, J. Izbicki, and J. , Conoir Scattering by two adjacent immersed shells : theory and experiment, Proceedings of the fourth European Conference on Underwater Acoustics, pp.837-842, 1998.

S. Lethuillier, P. Pareige, J. Conoir, and J. , Izbicki Scattering by two very close immersed shells : numerical results, Proceedings of the IEEE International Ultrasonics Symposium, pp.731-734, 1999.
DOI : 10.1109/ultsym.1999.849505

P. Bas, F. Luppé, and J. , N-shell cluster in water: Multiple scattering and splitting of resonances, The Journal of the Acoustical Society of America, vol.115, issue.4, pp.1460-1467, 2004.
DOI : 10.1121/1.1689345

P. Bas and P. , Pareige Numerical and experimental study of the résonant behavior of N elastic shells embedded in water, Proceedings of the IEEE International Ultrasonics, Ferroelectrics, and Frequency Control, 50th Anniversary and Joint Conference, pp.24-27, 2004.

. Elm, J. Kheddioui, P. Conoir, and J. Pareige, Izbicki Resonant scattering by two elastic cylindrical shells, ACUSTICA-acta acustica, pp.980-986, 1998.

J. Izbicki and J. , New results for Franz and Rayleigh waves propagating around a cylindrical vacuum/solid interface, Wave Motion, vol.28, issue.3, pp.227-239, 1998.
DOI : 10.1016/S0165-2125(98)00010-9

S. Robert, J. Conoir, H. Franklin, and F. , Resonant elastic scattering by a finite number of cylindrical cavities in an elastic matrix, Wave Motion, vol.40, issue.3, pp.225-239, 2004.
DOI : 10.1016/j.wavemoti.2004.03.003

S. Robert, J. Conoir, H. Franklin, and F. , Luppé Resonant multiple elastic scattering by a finite number of cylindrical cavities in an elastic matrix, Proceedings of the 5 th World Congress on Ultrasonics, pp.7-10, 2003.

S. G. Solomon, H. Überall, and K. B. , Yoo Mode conversion and resonance scattering of elastic waves from a cylindrical fluid-filled cavity, Acustica 55 [10] V. Twersky Multiple Scattering of radiation by an arbitrary configuration of parallel cylinders, J. Acoust, pp.147-159, 1984.

. Soc, . K. Am12-]-s, and A. K. Bose, Varadan Multiple scattering of acoustic, electromagnetic and elastic waves, Acoustic, electromagnetic and elastic wave scattering. Focus on the T-matrix approach Mal Longitudinal shear waves in a fiber-reinforced composite Wheeler On the mathematical description of light nuclei by the method of resonating group structure, 14] W. Heisenberg Die beobachtbaren Grössen in der Theorie der Elementarteilchen Die beobachtbaren Grössen in der Theorie der Elementarteilchen (II), Z. Phys. 120, pp.42-46, 1937.

L. Flax and L. R. Dragonette, Theory of elastic resonance excitation by sound scattering, The Journal of the Acoustical Society of America, vol.63, issue.3, pp.723-731, 1978.
DOI : 10.1121/1.381780

M. Abramowitz and I. A. , Stegun Handbook of mathematical functions, 1980.

L. D. Landau and E. M. , Lifchitz Quantum Mechanics : Non-relativistic Theory, 18] S. Derible Caractérisation complète des résonances acoustiques par une nouvelle méthode fondée sur le diagramme d'Argand Thèse de Doctorat, 1966.

S. Derible, P. Rembert, and J. , Izbicki Experimental determination of acoustic resonance width via the Argand Diagram Maze Diffusion d'une onde acoustique plane par des cylindres et des tubes immergés dans l'eau, Acustica, vol.84, pp.270-279, 1984.

G. Maze and J. , Ripoche Méthode d'Isolement et d'Identification des Résonances (M.I.I.R) de cylindres et de tubes soumis à une acoustique plane dans l'eau, Rev, pp.319-326, 1984.

S. Robert, H. Franklin, and J. , Conoir Elastic resonances of a periodic infinite array of fluid-filled cylindrical cavities embedded in an elastic medium Journal of Sound and Vibration, article soumis en octobre 2004. [23] V. Twersky On the scattering of waves by an infinite array, IEEE Trans. AP-4, pp.330-345, 1956.

C. Audoly, Modeling of compliant tube underwater reflectors, The Journal of the Acoustical Society of America, vol.87, issue.5, pp.1841-1846, 1990.
DOI : 10.1121/1.399310

E. B. Danila, J. Conoir, P. Pareige, and J. , Multichannel resonant scattering theory applied to the acoustic scattering by an eccentric elastic cylindrical shell immersed in a fluid, Wave Motion, vol.28, issue.4, pp.297-318, 1998.
DOI : 10.1016/S0165-2125(98)00018-3

P. Rembert, H. Frankin, and J. , Conoir Resonant Scattering Theory applied to a fluid-filled cylindrical cavity, J. Acoust. Soc. Am, vol.63, pp.723-731, 2004.

M. S. Choi and Y. M. , Cheong Matrix theory of elastic resonance scattering and its application to fluid-filled cavities, Acustica Acta Acustica 85, 32] L. N. Childs A concrete introduction to higher algebra, pp.170-180, 1999.

G. Breit and E. P. , Capture of Slow Neutrons, Physical Review, vol.49, issue.7, pp.519-531, 1936.
DOI : 10.1103/PhysRev.49.519

S. Robert, J. Conoir, and H. , Franklin Scattering by two-dimensional gratings composed of cylindrical in an elastic matrix, Proceeding of the 75 th Anniversary meeting (147 th Meeting, pp.24-28, 2004.

C. Audoly, Dumery Acoustic wave propagation in media containing two-dimensional periodically spaced elastic inclusions, pp.199-204, 1991.

L. S. Mulholland and M. A. , Multi-Directional Sound Wave Propagation Through A Tube Bundle, Journal of Sound and Vibration, vol.176, issue.3, pp.377-398, 1994.
DOI : 10.1006/jsvi.1994.1383

M. A. Heckl and L. S. , Some recent developments in the theory of acoustic transmission in tube bundles, Journal of Sound and Vibration, vol.179, issue.1, pp.37-62, 1995.
DOI : 10.1006/jsvi.1995.0003

J. Conoir, O. Lenoir, J. A. Éds, and . Guran, Izbicki Acoustic interactions with submerged elastic structures. Part I. Acoustic Scattering and Resonances [39] L. Brillouin Waves propagation in periodic structures, McGraw-Hill Cinquième édition, 1983. [41] L. L. Foldy The multiple scattering of waves. I. General theory of isotropic scattering by randomly distributed scatterers, World Scientific Phys. Rev, vol.67, pp.107-119, 1944.

P. C. Waterman and R. , Multiple Scattering of Waves, Journal of Mathematical Physics, vol.2, issue.4, pp.512-537, 1961.
DOI : 10.1063/1.1703737

J. G. Fikioris and P. C. , Multiple Scattering of Waves. II. ``Hole Corrections'' in the Scalar Case, 45] D. Sornette Acoustic waves in random media, pp.1413-1420, 1964.
DOI : 10.1063/1.1704077

A. Tourin and M. Fink, Derode Multiple scattering of sound, Waves in random media 10 R31-R60, 2000. [47] V. Twersky On propagation in random media of discrete scatterers Ishimaru Wave propagation and scattering in random media, Proceeding of the American Mathematical Society Symposium on Stochastic Process in Mathematical Physics and Ingineering 16, pp.84-116, 1964.

M. Abramowitz and I. A. Stegun, Handbook of Mathematical Functions, American Journal of Physics, vol.34, issue.2, 1980.
DOI : 10.1119/1.1972842